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Charged black hole solutions with Toroidal horizons in $f (R)$ $f (R)$ -gravity surrounded by quintessence and cloud of strings: Effective potential barrier, quasinormal modes

Younes Younesizadeh

https://orcid.org/0000-0003-1884-4060

Department of Physics, Isfahan University of Technology, Isfahan, Iran

E-mail Address: younesizadeh88@gmail.com

Corresponding author.

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Ehsan Gholami

Department of Physics, Isfahan University of Technology, Isfahan, Iran

E-mail Address: egholami.b@gmail.com

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, and

Zahra Mohammaddoust Lashkami

Department of Physics, University of Zanjan, Iran

E-mail Address: Z.mohammaddoust@znu.ac.ir

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https://doi.org/10.1142/S0219887821501164Cited by:1 (Source: Crossref)

Abstract

We construct a new class of $d$ $d$ -dimensional black hole solutions with Toroidal horizons in $f (R)$ $f (R)$ gravity framework which is surrounded by quintessence and string cloud configuration, whose asymptotic structures are determined by the quintessential state parameter $ω_{q}$ $ω_{q}$ and dimension’s parameter $d$ $d$ . We point out that the asymptotic behavior of the obtained solutions is neither asymptotically flat nor (A)dS when we have $\frac{ω_{q} + 2}{ω_{q} + 1} > d$ $\frac{ω_{q} + 2}{ω_{q} + 1} > d$ and $d \leq 3$ $d \leq 3$ . Regarding the cosmological constant as a thermodynamic pressure and its conjugate quantity as a thermodynamic volume, we investigate the critical behavior of our black hole solutions. In $d = 3$ $d = 3$ and $Q \neq 0$ $Q \neq 0$ , the P–V diagrams are more complex than that of the standard Van der Waals. These diagrams behave like the Born–Infeld-AdS P–V diagrams. When $d = 3$ $d = 3$ and $Q = 0$ $Q = 0$ , the P–V diagrams behave like the standard Van der Waals system (In this work [S. Gunasekaran, D. Kubiznaak and R. B. Mann, Extended phase space thermodynamics for charged and rotating black holes and Born–Infeld vacuum polarization, J. High Energy Phys. (2012).] [S. Gunasekaran, D. Kubiznaak and R.B. Mann, Extended phase space thermodynamics for charged and rotating black holes and Born–Infeld vacuum polarization, J. High Energy Phys. (2012)], the authors believe that the BTZ black holes, contrary to the higher-dimensional case, do not show any critical behavior. In this work, we have showed that the three-dimensional (3D) black holes can also have critical behavior and coincide with those of the Van der Waals system). Besides, we have analyzed the concept of effective potential barrier by transforming the radial equation of motion into standard Schrodinger form. We figure out the effect of the coupling constant $λ$ $λ$ , the string parameter b, and the quintessential state parameter $ω_{q}$ $ω_{q}$ on the height of the potential barrier and the other thermodynamical quantities like temperature and heat capacity. Then, we study the quasinormal modes (QNMs) of 3D black holes in the $f (R)$ $f (R)$ context. For this purpose, we use the WKB approximation method upto third-order corrections. We have shown the perturbation’s decay in corresponding diagrams when the string parameter b changes.

Keywords:

References

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